Ballistic Transport and Absolute Continuity of One-Frequency Schr\"odinger Operators

Abstract

For the solution u(t) to the discrete Schr\"odinger equation iddtun(t)=-(un+1(t)+un-1(t))+V(θ + nα)un(t), n∈, with α∈ and V∈ Cω(,), we consider the growth rate with t of its diffusion norm u(t)p:=(Σn∈(np+1) |un(t)|2)12, and the (non-averaged) transport exponents βu+(p) := t ∞ 2 u(t)pp t, βu-(p):= t ∞ 2 u(t)pp t. We will show that, if the corresponding Schr\"odinger operator has purely absolutely continuous spectrum, then βu(p)=1, provided that u(0) is well localized.